Bernstein--Sato Theory for D-modules in Positive Characteristic

Abstract

In this article, we develop a positive characteristic analogue of the Bernstein--Sato theory for holonomic D-modules in the complex setting. We work with D-modules on a Noetherian regular F-finite Fp-scheme X, and define their Bernstein--Sato roots as p-adic integers. When the D-module is the structure sheaf OX, this recovers Bitoun's definition. When the D-module arises from a locally finitely generated unit Fe-module and X is of finite type over an F-finite field, we show that the roots are finite and rational, generalizing Bitoun's result. In the course of the proof, we also develop a related theory for Cartier modules.